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Wolfram Language
QuantumFramework
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Wolfram Quantum Computation Framework
Tech Notes
Bell's Theorem
Circuit Diagram
Example Repository Functions
Exploring Fundamentals of Quantum Theory
Quantum object abstraction
Tensor Network
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QuantumBasis
QuantumChannel
QuantumCircuitMultiwayGraph [EXPERIMENTAL]
QuantumCircuitOperator
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QuantumEntangledQ
QuantumEntanglementMonotone
QuantumEvolve
QuantumMeasurement
QuantumMeasurementOperator
QuantumMeasurementSimulation
QuantumMPS [EXPERIMENTAL]
QuantumOperator
QuantumPartialTrace
QuantumPhaseSpaceTransform
QuantumShortcut [EXPERIMENTAL]
QuantumStateEstimate [EXPERIMENTAL]
QuantumState
QuantumTensorProduct
QuantumWignerMICTransform [EXPERIMENTAL]
QuantumWignerTransform [EXPERIMENTAL]
QuditBasis
QuditName
Wolfram`QuantumFramework`
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Examples
(
6
5
)
Basic Examples
(
6
)
Create an operator, given a matrix, with
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r
=
3
, in the Pauli X basis:
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1
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:
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:
2
→
2
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:
{
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}
→
{
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Create an angular-momentum operator
J
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with
j
=
3
/
2
:
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[
1
]
:
=
j
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=
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4
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:
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[
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[
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O
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[
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=
3
2
|
0
〉
〈
0
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+
1
2
|
1
〉
〈
1
|
-
1
2
|
2
〉
〈
2
|
-
3
2
|
3
〉
〈
3
|
Create a generalized Pauli X in the 3 dimension:
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[
1
]
:
=
Q
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[
3
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[
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:
3
→
3
Q
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:
1
→
1
Create a CNOT gate, with qubit-3 as the control and qubit-4 as the target:
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[
1
]
:
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[
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,
{
3
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4
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]
O
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[
1
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2
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:
4
→
4
Q
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:
2
→
2
Controlled operators, for example acting "X" on target qubits, with many controlled-0 and 1 qubits:
I
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[
1
]
:
=
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{
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{
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]
[
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=
Create a quantum Multiplexer:
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n
[
1
]
:
=
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:
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:
6
→
6
Q
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:
1
→
1
Represent its circuit diagram:
I
n
[
2
]
:
=
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[
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O
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=
S
c
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(
5
6
)
G
e
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&
E
x
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(
1
)
P
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&
R
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(
2
)
S
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A
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▪
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